On the Automorphisms of a Rank One Deligne-Hitchin Moduli Space

Abstract

Let X be a compact connected Riemann surface of genus g ≥ 2, and let M DH be the rank one Deligne-Hitchin moduli space associated to X. It is known that M DH is the twistor space for the hyper-K\"ahler structure on the moduli space of rank one holomorphic connections on X. We investigate the group Aut( M DH) of all holomorphic automorphisms of M DH. The connected component of Aut( M DH) containing the identity automorphism is computed. There is a natural element of H2( M DH, Z). We also compute the subgroup of Aut( M DH) that fixes this second cohomology class. Since M DH admits an ample rational curve, the notion of algebraic dimension extends to it by a theorem of Verbitsky. We prove that M DH is Moishezon.